English

Centers in Generalized Reflection Equation algebras

Quantum Algebra 2018-06-28 v2

Abstract

In the Reflection Equation (RE) algebra associated with an involutive or Hecke symmetry RR the center is generated by elements TrRLk{\rm Tr}_R L^k (called the quantum power sums), where LL is the generating matrix of this algebra and TrR{\rm Tr}_R is the RR-trace associated with RR. We consider the problem: whether it is so in certain RE-like algebras depending on spectral parameters. Mainly, we deal with algebras similar to those considered in \cite{RS} (we call them algebras of RS type). These algebras are defined by means of some current (i.e. depending on parameters) RR-matrices arising from involutive and Hecke symmetries via the so-called Baxterization procedure. We define quantum power sums in the algebras of RS type and show that the lowest quantum power sum in such an algebra is central iff the value of the "charge" cc entering its definition is critical. We exhibit the dependance of this critical value on the bi-rank of the initial symmetry RR. Besides, we show that if the bi-rank of RR is (mm)(m|m), and the value of cc is critical, then all quantum power sums are central.

Keywords

Cite

@article{arxiv.1712.06154,
  title  = {Centers in Generalized Reflection Equation algebras},
  author = {Dimitri Gurevich and Pavel Saponov},
  journal= {arXiv preprint arXiv:1712.06154},
  year   = {2018}
}

Comments

10 pages, no figures

R2 v1 2026-06-22T23:20:44.542Z